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Stirling-type pulse-tube refrigerator for 4 K. Ali Etaati R.M.M. Mattheij , A.S. Tijsseling , A.T.A.M. de Waele CASA-Day April 22. Presentation Contents Introduction . Domain Decomposition (DD) method, efficiency and robustness.
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Stirling-type pulse-tube refrigerator for 4 K Ali EtaatiR.M.M. Mattheij,A.S. Tijsseling,A.T.A.M. de WaeleCASA-DayApril 22
Presentation Contents Introduction. Domain Decomposition (DD) method, efficiency and robustness. Coupling the 1-D model of the Regenerator and the 2-D pulse-tube. 1-D modelling of the three-stage PTR. Summary and discussion.
Stirling-Type Pulse-Tube Refrigerator (S-PTR) Single-Stage PTR
Single-stage Stirling-PTR Heat of Compression Q Q Reservoir Compressor Regenerator Pulse Tube Q Orifice Cold Heat Exchanger Hot Heat Exchanger Aftercooler • Continuum fluid flow, • Newtonian flow, • Ideal gas, • No external forces act on the gas, • Oscillating flow.
Circulation of the gas parcel in the buffer, close to the tube, in a full cycle Gas parcel path in the Pulse-Tube Circulation of the gas parcel in the regenerator, close to the tube, in a full cycle`
Domain Decomposition Method – Uniform Grid Heat of Compression Q Q Reservoir Compressor Regenerator Pulse Tube Q Orifice Cold Heat Exchanger Hot Heat Exchanger Aftercooler Wall thickness Hot end Cold end C.L. Pulse-Tube
Domain Decomposition Method – Efficiency Uniform Grid Number of points: 200*200 = 4*104 • memory storage: 2*105 • DD Grid • Number of points: 20*20 + 20*20 + 20*20 + 20*20 = 1600 • memory storage: 8*103 • Comparison • Time consumption for the uniform grid: 1.3386 sec., • Time consumption for the DD grid: 0.0857 sec., • CPU complexity for the uniform grid: 16*108 • CPU complexity for the DD grid: 48*105
Coupling the 1-D Regenerator and the 2-D PT Heat of Compression Q Q Reservoir Compressor Regenerator Pulse Tube Q Orifice Cold Heat Exchanger Hot Heat Exchanger Aftercooler Mass Conservation at the interface
Coupling Algorithm • Solve the energy equations for both systems (pulse-tube and regenerator). • Iteration Loop • Initial Guess:Solve simultaneously the one-dimensional momentum equations in the PT and the regenerator as well as applying Darcy's law in the porous medium touse it as an I.G. • Loop: • Solve the momentum equation with Darcy's law only in the regenerator to find the thermodynamic pressure, P(t), at CHX. • b. Solve the pressure-correction algorithm in the PT two-dimensionally. • d. Compute the axial velocity at the PT’s CHX and use mass conservation to obtain the B.C. for the velocity in the regenerator, , at CHX.
Coupling Algorithm e. Compute the velocity difference at CHX: f. If go to the next time step. Otherwise go back to step “a" with, , as the new boundary condition for the regenerator velocity.
Junction Condition Mass Conservation at the interface: Energy Conservation at the interface: : Enthalpy flow, : Molar flow, : Molar enthalpy : Molar volume, : Gas constant, : Pressure, : Cross section.
Junction Condition Simplified enthalpy flow: Energy Conservation at the interface:
Boundary Condition for flow state I Regenerator I: The gas flows through the regenerator towards the junction (inflow). Then Neumann B.C. is taken into account . Tube I: The gas flows through the regenerator towards the junction (inflow). Then Neumann B.C. is taken into account . Regenerator II: The gas accumulated from the regenerator I and Tube I flows to the regenerator II or going out of the junction (outflow). Then Mass conservation is the proper B.C. for the regenerator II at the junction.
Summary and remarks • Modeling the pulse-tube in 2-D: • Using a successfully tested pressure-correction algorithm. • Improving the model by a Domain Decomposition method. • Applying at the same time a pressure-correction algorithm and a Domain Decomposition method was a challenge. • Coupling the 2-D tube model with the 1-D regenerator model: • Employing an iterative method to apply the proper interface conditions between two systems. • Modeling the three-stage PTR: • Solving the governing equations for the whole system simultaneously. • Applying the proper interface conditions.
Current steps of the project • Apply the non-ideal gas law as well as temperature material properties to the multi-stage PTR numerically specially for the third stage of the regenerator. • Do more numerical simulations to find possible lowest temperatures.
